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Edge length of Heptagon given circumradius Solution

STEP 0: Pre-Calculation Summary
Formula Used
side = Circumradius*(2*sin(pi/7))
S = rc*(2*sin(pi/7))
This formula uses 1 Constants, 1 Functions, 1 Variables
Constants Used
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Functions Used
sin - Trigonometric sine function, sin(Angle)
Variables Used
Circumradius - Circumradius is the radius of a circumsphere touching each of the polyhedron's or polygon's vertices. (Measured in Meter)
STEP 1: Convert Input(s) to Base Unit
Circumradius: 15 Meter --> 15 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
S = rc*(2*sin(pi/7)) --> 15*(2*sin(pi/7))
Evaluating ... ...
S = 13.0165121735267
STEP 3: Convert Result to Output's Unit
13.0165121735267 Meter --> No Conversion Required
FINAL ANSWER
13.0165121735267 Meter <-- Side
(Calculation completed in 00.016 seconds)

7 Edge length of Heptagon Calculators

Edge length of Heptagon given area
side = sqrt((4*Area*tan(pi/7))/7) Go
Edge length of Heptagon given long diagonal
side = Long diagonal*((2*sin((pi/2/7)))) Go
Edge length of Heptagon given short diagonal
side = Short diagonal/(2*cos(pi/7)) Go
Edge length of Heptagon given circumradius
side = Circumradius*(2*sin(pi/7)) Go
Edge length of Heptagon given inradius
side = Inradius*(2*(tan(pi/7))) Go
Edge length of Heptagon given height
side = Height*(2*tan(pi/2/7)) Go
Edge length of Heptagon given perimeter
side = Perimeter/7 Go

Edge length of Heptagon given circumradius Formula

side = Circumradius*(2*sin(pi/7))
S = rc*(2*sin(pi/7))

What is a heptagon?

Heptagon is a polygon with seven sides and seven vertices. Like any polygon, a heptagon may be either convex or concave, as illustrated in the next figure. When it is convex, all its interior angles are lower than 180°. On the other hand, when its is concave, one or more of its interior angles is larger than 180°. When all the edges of the heptagon are equal then it is called equilateral

How to Calculate Edge length of Heptagon given circumradius?

Edge length of Heptagon given circumradius calculator uses side = Circumradius*(2*sin(pi/7)) to calculate the Side, The Edge length of heptagon given circumradius formula is defined as the distance or measurement from point to point of heptagon , side = side of heptagon , radius = circumradius of heptagon. Side and is denoted by S symbol.

How to calculate Edge length of Heptagon given circumradius using this online calculator? To use this online calculator for Edge length of Heptagon given circumradius, enter Circumradius (rc) and hit the calculate button. Here is how the Edge length of Heptagon given circumradius calculation can be explained with given input values -> 13.01651 = 15*(2*sin(pi/7)).

FAQ

What is Edge length of Heptagon given circumradius?
The Edge length of heptagon given circumradius formula is defined as the distance or measurement from point to point of heptagon , side = side of heptagon , radius = circumradius of heptagon and is represented as S = rc*(2*sin(pi/7)) or side = Circumradius*(2*sin(pi/7)). Circumradius is the radius of a circumsphere touching each of the polyhedron's or polygon's vertices.
How to calculate Edge length of Heptagon given circumradius?
The Edge length of heptagon given circumradius formula is defined as the distance or measurement from point to point of heptagon , side = side of heptagon , radius = circumradius of heptagon is calculated using side = Circumradius*(2*sin(pi/7)). To calculate Edge length of Heptagon given circumradius, you need Circumradius (rc). With our tool, you need to enter the respective value for Circumradius and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Side?
In this formula, Side uses Circumradius. We can use 7 other way(s) to calculate the same, which is/are as follows -
  • side = Long diagonal*((2*sin((pi/2/7))))
  • side = Short diagonal/(2*cos(pi/7))
  • side = Height*(2*tan(pi/2/7))
  • side = Perimeter/7
  • side = Circumradius*(2*sin(pi/7))
  • side = Inradius*(2*(tan(pi/7)))
  • side = sqrt((4*Area*tan(pi/7))/7)
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